supermodular

Terms vs Supermodular - What's the difference?

As a noun terms

is .

As an adjective supermodular is

(mathematics|said of a function) having the property that

f(x \lor y) + f(x \land y) \geq f(x) + f(y)

for all x'', ''y'' $\isin$ ''r''^''k'', where ''x'' $\vee$ ''y'' denotes the componentwise maximum and ''x'' $\wedge$ ''y'' the componentwise minimum of ''x'' and ''y .

Supermodularity vs Supermodular - What's the difference?

supermodularity | supermodular | Related terms |

Supermodularity is a related term of supermodular.

As a noun supermodularity

is the condition of being supermodular.

As an adjective supermodular is

(mathematics|said of a function) having the property that

f(x \lor y) + f(x \land y) \geq f(x) + f(y)

for all x'', ''y'' $\isin$ ''r''^''k'', where ''x'' $\vee$ ''y'' denotes the componentwise maximum and ''x'' $\wedge$ ''y'' the componentwise minimum of ''x'' and ''y .

Submodular vs Supermodular - What's the difference?

submodular | supermodular | Antonyms |

Submodular is an antonym of supermodular.

As adjectives the difference between submodular and supermodular

is that submodular is of, pertaining to, or composed of submodules while supermodular is (mathematics|said of a function) having the property that

f(x \lor y) + f(x \land y) \geq f(x) + f(y)

for all x'', ''y'' $\isin$ ''r''^''k'', where ''x'' $\vee$ ''y'' denotes the componentwise maximum and ''x'' $\wedge$ ''y'' the componentwise minimum of ''x'' and ''y .