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Iosif Pinelis
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$a_{mn}=1(m\ge n)$ is a counterexample. (Here, $1(A)$ is the indicator of an assertion $A$. That is, $1(A):=1$ if $A$ is true and $1(A):=0$ if $A$ is false.)

If you insist on understanding "increasing" in the strict sense, then $a_{mn}=1(m\ge n)-1/m-1/n$ is a counterexample.

$a_{mn}=1(m\ge n)$ is a counterexample.

If you insist on understanding "increasing" in the strict sense, then $a_{mn}=1(m\ge n)-1/m-1/n$ is a counterexample.

$a_{mn}=1(m\ge n)$ is a counterexample. (Here, $1(A)$ is the indicator of an assertion $A$. That is, $1(A):=1$ if $A$ is true and $1(A):=0$ if $A$ is false.)

If you insist on understanding "increasing" in the strict sense, then $a_{mn}=1(m\ge n)-1/m-1/n$ is a counterexample.

added 121 characters in body
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Iosif Pinelis
  • 128k
  • 8
  • 107
  • 229

$a_{mn}=1(m\ge n)$ is a counterexample.

If you insist on understanding "increasing" in the strict sense, then $a_{mn}=1(m\ge n)-1/m-1/n$ is a counterexample.

$a_{mn}=1(m\ge n)$ is a counterexample.

$a_{mn}=1(m\ge n)$ is a counterexample.

If you insist on understanding "increasing" in the strict sense, then $a_{mn}=1(m\ge n)-1/m-1/n$ is a counterexample.

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Iosif Pinelis
  • 128k
  • 8
  • 107
  • 229

$a_{mn}=1(m\ge n)$ is a counterexample.