💡 Words with a Similar Meaning to "Pseudocompact"
Found via reverse dictionary — words that share a conceptual meaning.
| Word | Definition |
|---|---|
| cocompactnoun | (of a group action, or its group) Having a compact quotient space. |
| quasicompactnoun | Alternative form of quasi-compact. [(topology, of a space) In which has every open cover has a finite subcover.] |
| realcompact | Of a topological space, that can be embedded in a real line. |
| quasi-compact | (topology, of a space) In which has every open cover has a finite subcover. |
| paracompactnoun | (mathematics, of a topological space) In which every open cover admits an open locally finite refinement. |
| locally compact | (topology) Of a topological space: such that, for every point of the space, there is a neighborhood of that point whose closure is compact. |
| precompactnoun | To compact partially in preparation for full compaction or extrusion. |
| pseudorational | Supposedly, but not actually, rational; having only a veneer of reason or logic. |
| pseudoholomorphic | — |
| pseudocollarable | (mathematics) Such that there exists a neighborhood that is homeomorphic to a product, but this homeomorphism may not preserve all the desired structures or conditions that a true collar neighborhood would. |
| pseudocomplex | (mathematics) Relating to the square root of ±1 |
| closed | Not available for operation, participation, interaction, etc. |
| hyperregular | (mathematics, Of a Borel set) Having a bounded image over all arguments for every member. |
| supercompactnoun | Very compact. |
| pseudohyperbolic | — |
| paracompactifying | (mathematics) That makes something paracompact. |
| σ-compact | (mathematical analysis, of a set in a topological space) That is expressible as a countable union of compact sets. |
| compactnoun | An agreement or contract. |
| pseudoconformal | (mathematics) That appears to conform, but in practice does not. |
| metacompactnoun | (topology) Of a topological space: such that every open cover has a point finite open refinement. That is, given any open cover of the topological space, there is a refinement which is again an open cover with the property that every point is contained only in finitely many sets of the refining cover. |
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