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# Tag Archives: partitions of graphs

## Partitions of Graphs XI: The Case of all Sufficiently Large n

This the eleventh in a series, the first being found here: Part 1, and the previous here Part 10. In this post I provide examples of Q1 graphs of all orders n, for sufficiently large n. In particular this will … Continue reading

## Partitions of Graphs X: The Case of Composite Integers

This is the tenth in a series, the first being found here: Part 1, and the previous here: Part 9. In this post I introduce a family of graphs that provides examples of Q1 graphs for all composite orders. If … Continue reading

## A Morning of Math

I’ve been sick and had to stay home from work the last several days. This morning I told my kids that they could choose to put away their clothes or do math. They chose math. I set both B and … Continue reading

## The Chicken’s Claw

I had my fifth evening of math with my kids. I got a box of 100 washers from the hardware store and some yarn. I had the kids draw some graphs and then make some graphs with the washers as … Continue reading

## Partitions of Graphs VI: Q1 Graphs

This is the sixth in a series. The first is found here: Part I. The previous is found here: Part V. I have defined q(G) to be: q(G) = p(n) – p(G), where n is the number of nodes in G. … Continue reading

## Partitions of Graphs V: Some Examples

This is the fifth in a series. See the first here: Part I, and the previous here: Part IV. In my last post I said what I mean by p(G), when G is a graph. Namely, it is the number … Continue reading

Posted in graphs
Tagged complete graphs, edgeless graphs, graphs, partitions, partitions of graphs, paths, stars
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