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symmetricus

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There are 11 letters in SYMMETRICUS ( C3E1I1M3R1S1T1U1Y4 )

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9 letters out of SYMMETRICUS

CRUMMIEST SCUMMIEST SYMMETRIC

8 letters out of SYMMETRICUS

CITRUSES CRUMMIES CURTSEYS CURTSIES MISTERMS RICTUSES RUMMIEST SCUMMERS SCUMMIER SECURITY SUMMITRY SYSTEMIC YUMMIEST

7 letters out of SYMMETRICUS

CERIUMS CESIUMS CITRUSY CRISSUM CRUISES CRUMMIE CRUSETS CUMMERS CURITES CURTESY CURTSEY CUTISES ESTRUMS ICTERUS ICTUSES IMMURES METRICS MISCUES MISCUTS MISTERM MISTERS MISUSER MURICES MUSSIER MUSTERS MUSTIER MUTISMS MYSTICS RECTUMS RUMMEST RUMMIES RUSSETY RUSTICS SCUMMER SIMMERS SISTRUM SMITERS STYMIES SUITERS SUMMERS SUMMERY SUMMITS SURMISE TISSUEY TRISMUS TRUISMS TSIMMES TUMMIES YUMMIER YUMMIES

6 letters out of SYMMETRICUS

CERIUM CESIUM CESTUS CISTUS CITERS CITRUS CRESSY CRESTS CRIMES CRISES CRUETS CRUISE CRUMMY CRUSES CRUSET CRUSTS CRUSTY CUISSE CUMMER CURETS CURIES CURITE CURSES CURTSY CUSSER CUTESY CUTEYS CUTIES CYESIS ERUCTS ESTRUM ESTRUS IMMURE ISSUER ITERUM MERITS METRIC MIMERS MISCUE MISCUT MISERS MISERY MISMET MISSET MISTER MISUSE MITERS MITRES MUSERS MUSICS MUSTER MUTISM MYSTIC RECITS RECTUM RECTUS RECUTS REMISS REMITS RESIST RESITS RICTUS RUSSET RUSTIC SCRIES SCRIMS SCRUMS SCUMMY SCUTES SERUMS SIEURS SIMMER SISTER SMITER SMITES STEMMY STERIC STIMES STRUMS STYMIE SUCRES SUITER SUITES SUMMER SUMMIT SUREST SURETY SYSTEM TIMERS TISSUE TMESIS TRESSY TRICES TRUCES TRUISM TSURIS TUSSER TUYERS UREMIC URETIC

5 letters out of SYMMETRICUS

CESTI CIRES CISSY CISTS CITER CITES CRESS CREST CRIES CRIME CRITS CRUET CRUSE CRUST CURES CURET CURIE CURSE CURST CUTER CUTES CUTEY CUTIE CUTIS CYMES CYSTS ECRUS EMIRS EMITS EMMYS ERUCT ETUIS ICTUS ISSUE ITEMS MERCS MERCY MERIT MESIC MESSY METIS MIMER MIMES MIRES MISER MISES MISSY MISTS MISTY MITER MITES MITRE MURES MUSER MUSES MUSIC MUSSY MUSTS MUSTY MUTER MUTES RECIT RECTI RECUT REMIT RESIT RESTS RICES RIMES RISES RISUS RITES RUMMY RUSES RUSTS RUSTY SCRIM SCRUM SCUMS SCUTE SCUTS SECTS SEISM SEMIS SERUM SICES SIEUR SIRES SITES SITUS SMITE SMUTS STEMS STIES STIME STIMY STIRS STRUM STUMS STYES SUCRE SUERS SUETS SUETY SUITE SUITS SYCES TERMS TIERS TIMER TIMES TIRES TRESS TREYS TRICE TRIES TRIMS TRUCE TRUES TRUSS TUMMY TUYER TYERS TYRES UREIC USERS UTERI YETIS YURTS

4 letters out of SYMMETRICUS

CESS CIRE CIST CITE CITY CRIS CRIT CRUS CUES CURE CURS CURT CUSS CUTE CUTS CYME CYST ECRU ECUS EMIC EMIR EMIT EMMY EMUS ERST ETIC ETUI ICES IMMY IRES ISMS ITEM MEMS MERC MESS MICE MICS MIME MIRE MIRS MIRY MISE MISS MIST MITE MITY MUMS MURE MUSE MUSS MUST MUTE MUTS MYCS RECS REIS REMS REST RETS RICE RIME RIMS RIMY RISE RITE RUES RUMS RUSE RUST RUTS RYES SCRY SCUM SCUT SECS SECT SEIS SEMI SERS SETS SICE SICS SIMS SIRE SIRS SITE SITS SMIT SMUT SRIS STEM STEY STIR STUM STYE SUER SUES SUET SUIT SUMS SURE SYCE TERM TICS TIER TIES TIME TIRE TRES TREY TRIM TRUE TUIS TYER TYES TYRE URIC USER USES UTES YETI YURT

3 letters out of SYMMETRICUS

CIS CRU CRY CUE CUM CUR CUT ECU EMS EMU ERS ESS ICE ICY IRE ISM ITS MEM MET MIC MIM MIR MIS MUM MUS MUT MYC REC REI REM RES RET RIM RUE RUM RUT RYE SEC SEI SER SET SIC SIM SIR SIS SIT SRI STY SUE SUM TIC TIE TIS TRY TUI TYE UMM USE UTE UTS YES YET YUM

2 letters out of SYMMETRICUS

EM ER ES ET IS IT ME MI MM MU MY RE SI TI UM US UT YE

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Definitions of symmetricus in various dictionaries:

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Symmetricus might refer to
In differential geometry, representation theory and harmonic analysis, a symmetric space is a pseudo-Riemannian manifold whose group of symmetries contains an inversion symmetry about every point. This can be made more precise, in either the language of Riemannian geometry or of Lie theory. The Riemannian definition is more geometric, and plays a deep role in the theory of holonomy.
* The Lie-theoretic definition is more algebraic.
* In Riemannian geometry, a complete, simply connected Riemannian manifold is a symmetric space if and only if its curvature tensor is invariant under parallel transport. More generally, a Riemannian manifold (M, g) is said to be symmetric if and only if, for each point p of M, there exists an isometry of M fixing p and acting on the tangent space
*
*
*
*
* T
*
* p
*
*
* M
*
*
* {\displaystyle T_{p}M}
* of M at p by minus the identity.
* Any symmetric space is complete, and has a finite cover which is a simply connected symmetric space; thus these two characterizations in fact coincide up to finite covers. Both descriptions can also naturally be extended to the setting of pseudo-Riemannian manifolds.
* From the point of view of Lie theory, a symmetric space is the quotient G/H of Lie group G by a Lie subgroup H, where the Lie algebra
*
*
*
*
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* h
*
*
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* {\displaystyle {\mathfrak {h}}}
* of H is also required to be the +1-eigenspace of an involution of the Lie algebra
*
*
*
*
*
* g
*
*
*
*
* {\displaystyle {\mathfrak {g}}}
* of G.
* As stated, this characterization includes pseudo-Riemannian spaces as well as a Riemannian ones; extra algebraic conditions are needed to restrict to the Riemannian case.
* Riemannian symmetric spaces arise in a wide variety of situations in both mathematics and physics. They were first classified by Élie Cartan. Their central role in the theory of holonomy was discovered by Marcel Berger. They are important objects of study in representation theory and harmonic analysis as well as in differential geometry.
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