MathDB

Let

M

be a finite set and

P=\{ M_1,M_2,\ldots ,M_l\}

a partition of

M

(i.e.,

\bigcup_{i=1}^k M_i, M_i\not=\emptyset, M_i\cap M_j =\emptyset

for all

i,j\in\{1,2, \ldots ,k\} ,i\not= j)

. We define the following elementary operation on

P

: Choose

i,j\in\{1,2,\ldots ,k\}

, such that

i=j

and

M_i

has a elements and

M_j

has

b

elements such that

a\ge b

. Then take

b

elements from

M_i

and place them into

M_j

, i.e.,

M_j

becomes the union of itself and a

b

-element subset of

M_i

, while the same subset is subtracted from

M_i

(if

a=b

M_i

is thus removed from the partition). Let a finite set

M

be given. Prove that the property “for every partition

P

M

there exists a sequence

P=P_1,P_2,\ldots ,P_r

such that

P_{i+1}

is obtained from

P_i

by an elementary operation and

P_r=\{M\}

” is equivalent to “the number of elements of

M

is a power of

2

.”

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