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How to colour the US map with Yellow, Green, Red and Blue to minimize the number of states with the colour of Green



Announcing the arrival of Valued Associate #679: Cesar Manara
Planned maintenance scheduled April 17/18, 2019 at 00:00UTC (8:00pm US/Eastern)Did the Appel/Haken graph colouring (four colour map) proof really not contribute to understanding?How many four-vertex graphs are there up to isomorphism;$Z_n backslash 0$ splits into octetsHow many different cubes can be obtained if four colours are used?Coloring the 6 vertices of a regular hexagon with a limited use per colorKempe's proof of the four colour theoremAlgorithm to solve this grid puzzle?Explain this proof of the 5-color theoremFinding a maximum connected planar graph to prove the four colour theoremGraph colouring problem










23












$begingroup$


I want to colour the US (only the states) map with Yellow, Green, Red and Blue. I was wondering what would be the lowest number of states with the colour of Green. We can of course use the other colours as much as we want. Please note that I want to follow the Four Color Theorem rules.



Motivation:
I am studying graph theory and I want to know if there is a way that we could limit the use of the fourth colour as much as possible. This is not a homework problem.



My attempt:
I have tried many variations and can limit it to 6 and it seems like the
minimum possible but there are many possibilities to try ($4^50$). Therefore I was wondering if there is a simpler method? Thank you in advance.



Clarification:
I am interested in only the mainland of USA. For states like Michigan that are split, I used the same colour for both parts (since they were not connected directly).










share|cite|improve this question











$endgroup$







  • 1




    $begingroup$
    you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
    $endgroup$
    – Will Jagy
    Apr 14 at 3:36






  • 1




    $begingroup$
    blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
    $endgroup$
    – Will Jagy
    Apr 14 at 3:40










  • $begingroup$
    thank you for your suggestion, I made a few clarifications.
    $endgroup$
    – Bor Kari
    Apr 14 at 4:00










  • $begingroup$
    @WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
    $endgroup$
    – Marc van Leeuwen
    Apr 14 at 17:09






  • 1




    $begingroup$
    There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
    $endgroup$
    – Derek Elkins
    Apr 14 at 20:10















23












$begingroup$


I want to colour the US (only the states) map with Yellow, Green, Red and Blue. I was wondering what would be the lowest number of states with the colour of Green. We can of course use the other colours as much as we want. Please note that I want to follow the Four Color Theorem rules.



Motivation:
I am studying graph theory and I want to know if there is a way that we could limit the use of the fourth colour as much as possible. This is not a homework problem.



My attempt:
I have tried many variations and can limit it to 6 and it seems like the
minimum possible but there are many possibilities to try ($4^50$). Therefore I was wondering if there is a simpler method? Thank you in advance.



Clarification:
I am interested in only the mainland of USA. For states like Michigan that are split, I used the same colour for both parts (since they were not connected directly).










share|cite|improve this question











$endgroup$







  • 1




    $begingroup$
    you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
    $endgroup$
    – Will Jagy
    Apr 14 at 3:36






  • 1




    $begingroup$
    blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
    $endgroup$
    – Will Jagy
    Apr 14 at 3:40










  • $begingroup$
    thank you for your suggestion, I made a few clarifications.
    $endgroup$
    – Bor Kari
    Apr 14 at 4:00










  • $begingroup$
    @WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
    $endgroup$
    – Marc van Leeuwen
    Apr 14 at 17:09






  • 1




    $begingroup$
    There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
    $endgroup$
    – Derek Elkins
    Apr 14 at 20:10













23












23








23


2



$begingroup$


I want to colour the US (only the states) map with Yellow, Green, Red and Blue. I was wondering what would be the lowest number of states with the colour of Green. We can of course use the other colours as much as we want. Please note that I want to follow the Four Color Theorem rules.



Motivation:
I am studying graph theory and I want to know if there is a way that we could limit the use of the fourth colour as much as possible. This is not a homework problem.



My attempt:
I have tried many variations and can limit it to 6 and it seems like the
minimum possible but there are many possibilities to try ($4^50$). Therefore I was wondering if there is a simpler method? Thank you in advance.



Clarification:
I am interested in only the mainland of USA. For states like Michigan that are split, I used the same colour for both parts (since they were not connected directly).










share|cite|improve this question











$endgroup$




I want to colour the US (only the states) map with Yellow, Green, Red and Blue. I was wondering what would be the lowest number of states with the colour of Green. We can of course use the other colours as much as we want. Please note that I want to follow the Four Color Theorem rules.



Motivation:
I am studying graph theory and I want to know if there is a way that we could limit the use of the fourth colour as much as possible. This is not a homework problem.



My attempt:
I have tried many variations and can limit it to 6 and it seems like the
minimum possible but there are many possibilities to try ($4^50$). Therefore I was wondering if there is a simpler method? Thank you in advance.



Clarification:
I am interested in only the mainland of USA. For states like Michigan that are split, I used the same colour for both parts (since they were not connected directly).







graph-theory recreational-mathematics coloring






share|cite|improve this question















share|cite|improve this question













share|cite|improve this question




share|cite|improve this question








edited Apr 14 at 20:53







Bor Kari

















asked Apr 14 at 3:32









Bor KariBor Kari

45611




45611







  • 1




    $begingroup$
    you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
    $endgroup$
    – Will Jagy
    Apr 14 at 3:36






  • 1




    $begingroup$
    blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
    $endgroup$
    – Will Jagy
    Apr 14 at 3:40










  • $begingroup$
    thank you for your suggestion, I made a few clarifications.
    $endgroup$
    – Bor Kari
    Apr 14 at 4:00










  • $begingroup$
    @WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
    $endgroup$
    – Marc van Leeuwen
    Apr 14 at 17:09






  • 1




    $begingroup$
    There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
    $endgroup$
    – Derek Elkins
    Apr 14 at 20:10












  • 1




    $begingroup$
    you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
    $endgroup$
    – Will Jagy
    Apr 14 at 3:36






  • 1




    $begingroup$
    blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
    $endgroup$
    – Will Jagy
    Apr 14 at 3:40










  • $begingroup$
    thank you for your suggestion, I made a few clarifications.
    $endgroup$
    – Bor Kari
    Apr 14 at 4:00










  • $begingroup$
    @WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
    $endgroup$
    – Marc van Leeuwen
    Apr 14 at 17:09






  • 1




    $begingroup$
    There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
    $endgroup$
    – Derek Elkins
    Apr 14 at 20:10







1




1




$begingroup$
you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
$endgroup$
– Will Jagy
Apr 14 at 3:36




$begingroup$
you would need to agree on a favorite version of the graph. In the actual US, there are islands, states split into disconnected regions, other things forbidden
$endgroup$
– Will Jagy
Apr 14 at 3:36




1




1




$begingroup$
blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
$endgroup$
– Will Jagy
Apr 14 at 3:40




$begingroup$
blog.computationalcomplexity.org/2006/05/… They correctly point out that three colors cannot work, as Nevada has an odd number of neighbors
$endgroup$
– Will Jagy
Apr 14 at 3:40












$begingroup$
thank you for your suggestion, I made a few clarifications.
$endgroup$
– Bor Kari
Apr 14 at 4:00




$begingroup$
thank you for your suggestion, I made a few clarifications.
$endgroup$
– Bor Kari
Apr 14 at 4:00












$begingroup$
@WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
$endgroup$
– Marc van Leeuwen
Apr 14 at 17:09




$begingroup$
@WillJagy Maine has an odd number of neighbours too, but that's not much of a problem.
$endgroup$
– Marc van Leeuwen
Apr 14 at 17:09




1




1




$begingroup$
There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
$endgroup$
– Derek Elkins
Apr 14 at 20:10




$begingroup$
There are not infinite possibilities. There is only $4^50$ ways of assigning colors to all the states even if we consider no other constraints or symmetries.
$endgroup$
– Derek Elkins
Apr 14 at 20:10










1 Answer
1






active

oldest

votes


















28












$begingroup$

The minimum is two states that use the fourth color. Nevada and its five neighbors cannot be colored with only three colors, and similarly West Virginia and its five neighbors cannot be colored with only three colors. In both cases, once you color the center state one color (say, red), you can't use it again on its neighbors: without using green, they'd have to alternate yellow-blue-yellow-blue, but because the number of neighbors is odd, you'd get stuck at the end.



(In the comments, David K points out that Kentucky is a third state with the same problem: it has seven neighbors. But this doesn't force us to use a third green state, because Kentucky and West Virginia share a border and some common neighbors.)



Using only two green states is possible. If we color Arizona (dealing with the Nevada situation) and Ohio (dealing with West Virginia and Kentucky) both green, then the remainder of the map can be completed using only blue, red, and yellow:



enter image description here



Adjacencies between the states may be easier to see here.






share|cite|improve this answer











$endgroup$








  • 2




    $begingroup$
    just curious -- did you write code to do this, or did you do this by hand?
    $endgroup$
    – antkam
    Apr 14 at 4:56






  • 3




    $begingroup$
    @antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
    $endgroup$
    – Misha Lavrov
    Apr 14 at 5:56







  • 1




    $begingroup$
    @WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
    $endgroup$
    – hobbs
    Apr 14 at 7:35






  • 2




    $begingroup$
    Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
    $endgroup$
    – David K
    Apr 14 at 13:08







  • 1




    $begingroup$
    Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
    $endgroup$
    – Will Jagy
    Apr 14 at 15:58











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1 Answer
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active

oldest

votes








1 Answer
1






active

oldest

votes









active

oldest

votes






active

oldest

votes









28












$begingroup$

The minimum is two states that use the fourth color. Nevada and its five neighbors cannot be colored with only three colors, and similarly West Virginia and its five neighbors cannot be colored with only three colors. In both cases, once you color the center state one color (say, red), you can't use it again on its neighbors: without using green, they'd have to alternate yellow-blue-yellow-blue, but because the number of neighbors is odd, you'd get stuck at the end.



(In the comments, David K points out that Kentucky is a third state with the same problem: it has seven neighbors. But this doesn't force us to use a third green state, because Kentucky and West Virginia share a border and some common neighbors.)



Using only two green states is possible. If we color Arizona (dealing with the Nevada situation) and Ohio (dealing with West Virginia and Kentucky) both green, then the remainder of the map can be completed using only blue, red, and yellow:



enter image description here



Adjacencies between the states may be easier to see here.






share|cite|improve this answer











$endgroup$








  • 2




    $begingroup$
    just curious -- did you write code to do this, or did you do this by hand?
    $endgroup$
    – antkam
    Apr 14 at 4:56






  • 3




    $begingroup$
    @antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
    $endgroup$
    – Misha Lavrov
    Apr 14 at 5:56







  • 1




    $begingroup$
    @WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
    $endgroup$
    – hobbs
    Apr 14 at 7:35






  • 2




    $begingroup$
    Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
    $endgroup$
    – David K
    Apr 14 at 13:08







  • 1




    $begingroup$
    Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
    $endgroup$
    – Will Jagy
    Apr 14 at 15:58















28












$begingroup$

The minimum is two states that use the fourth color. Nevada and its five neighbors cannot be colored with only three colors, and similarly West Virginia and its five neighbors cannot be colored with only three colors. In both cases, once you color the center state one color (say, red), you can't use it again on its neighbors: without using green, they'd have to alternate yellow-blue-yellow-blue, but because the number of neighbors is odd, you'd get stuck at the end.



(In the comments, David K points out that Kentucky is a third state with the same problem: it has seven neighbors. But this doesn't force us to use a third green state, because Kentucky and West Virginia share a border and some common neighbors.)



Using only two green states is possible. If we color Arizona (dealing with the Nevada situation) and Ohio (dealing with West Virginia and Kentucky) both green, then the remainder of the map can be completed using only blue, red, and yellow:



enter image description here



Adjacencies between the states may be easier to see here.






share|cite|improve this answer











$endgroup$








  • 2




    $begingroup$
    just curious -- did you write code to do this, or did you do this by hand?
    $endgroup$
    – antkam
    Apr 14 at 4:56






  • 3




    $begingroup$
    @antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
    $endgroup$
    – Misha Lavrov
    Apr 14 at 5:56







  • 1




    $begingroup$
    @WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
    $endgroup$
    – hobbs
    Apr 14 at 7:35






  • 2




    $begingroup$
    Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
    $endgroup$
    – David K
    Apr 14 at 13:08







  • 1




    $begingroup$
    Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
    $endgroup$
    – Will Jagy
    Apr 14 at 15:58













28












28








28





$begingroup$

The minimum is two states that use the fourth color. Nevada and its five neighbors cannot be colored with only three colors, and similarly West Virginia and its five neighbors cannot be colored with only three colors. In both cases, once you color the center state one color (say, red), you can't use it again on its neighbors: without using green, they'd have to alternate yellow-blue-yellow-blue, but because the number of neighbors is odd, you'd get stuck at the end.



(In the comments, David K points out that Kentucky is a third state with the same problem: it has seven neighbors. But this doesn't force us to use a third green state, because Kentucky and West Virginia share a border and some common neighbors.)



Using only two green states is possible. If we color Arizona (dealing with the Nevada situation) and Ohio (dealing with West Virginia and Kentucky) both green, then the remainder of the map can be completed using only blue, red, and yellow:



enter image description here



Adjacencies between the states may be easier to see here.






share|cite|improve this answer











$endgroup$



The minimum is two states that use the fourth color. Nevada and its five neighbors cannot be colored with only three colors, and similarly West Virginia and its five neighbors cannot be colored with only three colors. In both cases, once you color the center state one color (say, red), you can't use it again on its neighbors: without using green, they'd have to alternate yellow-blue-yellow-blue, but because the number of neighbors is odd, you'd get stuck at the end.



(In the comments, David K points out that Kentucky is a third state with the same problem: it has seven neighbors. But this doesn't force us to use a third green state, because Kentucky and West Virginia share a border and some common neighbors.)



Using only two green states is possible. If we color Arizona (dealing with the Nevada situation) and Ohio (dealing with West Virginia and Kentucky) both green, then the remainder of the map can be completed using only blue, red, and yellow:



enter image description here



Adjacencies between the states may be easier to see here.







share|cite|improve this answer














share|cite|improve this answer



share|cite|improve this answer








edited Apr 14 at 14:32

























answered Apr 14 at 3:56









Misha LavrovMisha Lavrov

49.7k759109




49.7k759109







  • 2




    $begingroup$
    just curious -- did you write code to do this, or did you do this by hand?
    $endgroup$
    – antkam
    Apr 14 at 4:56






  • 3




    $begingroup$
    @antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
    $endgroup$
    – Misha Lavrov
    Apr 14 at 5:56







  • 1




    $begingroup$
    @WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
    $endgroup$
    – hobbs
    Apr 14 at 7:35






  • 2




    $begingroup$
    Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
    $endgroup$
    – David K
    Apr 14 at 13:08







  • 1




    $begingroup$
    Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
    $endgroup$
    – Will Jagy
    Apr 14 at 15:58












  • 2




    $begingroup$
    just curious -- did you write code to do this, or did you do this by hand?
    $endgroup$
    – antkam
    Apr 14 at 4:56






  • 3




    $begingroup$
    @antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
    $endgroup$
    – Misha Lavrov
    Apr 14 at 5:56







  • 1




    $begingroup$
    @WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
    $endgroup$
    – hobbs
    Apr 14 at 7:35






  • 2




    $begingroup$
    Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
    $endgroup$
    – David K
    Apr 14 at 13:08







  • 1




    $begingroup$
    Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
    $endgroup$
    – Will Jagy
    Apr 14 at 15:58







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just curious -- did you write code to do this, or did you do this by hand?
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– antkam
Apr 14 at 4:56




$begingroup$
just curious -- did you write code to do this, or did you do this by hand?
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– antkam
Apr 14 at 4:56




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@antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
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– Misha Lavrov
Apr 14 at 5:56





$begingroup$
@antkam By hand. I found two subgraphs where a fourth color is forced, and chose a state from each of them to color green that seemed to be a good choice. Then I just tried to color the rest with three colors - and for that, once you color the first two states, most of the rest of the map is forced, except for a few states like Maine.
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– Misha Lavrov
Apr 14 at 5:56





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@WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
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– hobbs
Apr 14 at 7:35




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@WillJagy NJ and MD don't touch because DE interposes. All the other edges exist.
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– hobbs
Apr 14 at 7:35




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Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
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– David K
Apr 14 at 13:08





$begingroup$
Kentucky has seven neighbors, but coloring Ohio green fixes that as well as WV. I also notice that you managed to use four colors for UT, CO, AZ, and NM, which makes the map a little clearer but I think is not strictly required by the usual rules, that is, under the usual rules (as far as I know) you could make AZ yellow and CA green.
$endgroup$
– David K
Apr 14 at 13:08





1




1




$begingroup$
Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
$endgroup$
– Will Jagy
Apr 14 at 15:58




$begingroup$
Point of scientific interest: points such as the Four Corners en.wikipedia.org/wiki/Four_Corners_Monument happen only when legislated by humans. In nature, existing edges, such as riverbeds, split on one side in an orthogonal manner, creating a T junction that is, well, typically fractal. One can do an experiment with a plate of wet clay, heat it under a lamp, and watch edges appear as the mud dries out. I will try to find out the name for this...
$endgroup$
– Will Jagy
Apr 14 at 15:58

















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