@article{fdi:010077128,
  title = {{T}he dynamics of elongated earthquake ruptures},
  author = {{W}eng, {H}. {H}. and {A}mpuero, {J}ean-{P}aul},
  editor = {},
  language = {{ENG}},
  abstract = {{T}he largest earthquakes propagate laterally after saturating the fault's seismogenic width and reach large length-to-width ratios {L}/{W}. {S}maller earthquakes can also develop elongated ruptures due to confinement by heterogeneities of initial stresses or material properties. {T}he energetics of such elongated ruptures is radically different from that of conventional circular crack models: they feature width-limited rather than length-dependent energy release rate. {H}owever, a synoptic understanding of their dynamics is still missing. {H}ere we combine computational and analytical modeling of long ruptures in three dimension (3{D}) and 2.5{D} (width-averaged) to develop a theoretical relation between the evolution of rupture speed and the along-strike distribution of fault stress, fracture energy, and rupture width. {W}e find that the evolution of elongated ruptures in our simulations is well described by the following rupture-tip-equation-of-motion: {G}(c) = {G}(0) (1 - (v)over dot(r){W}/v(s)(2) gamma/{A} alpha({P})(s)) where {G}(c) is the fracture energy, {G}(0) is the steady state energy release rate, v(s) is the {S} wave speed, v(r) is the rupture speed, (v)overdot(r) = dv(r)/dt is the rupture acceleration, and gamma/{A} alpha({P})(s) is a known function of rupture speed. {T}he steady energy release rate is limited by rupture width as {G}(0) = gamma {D}elta tau {W}-2/mu, where gamma is a geometric factor, {D}elta tau is the stress drop (spatially smoothed over a length scale smaller than {W}), and mu is the shear modulus. {I}f {G}(c) is a constant and exactly balanced by {G}(0), the rupture can in principle propagate steadily at any speed. {I}f {G}(c) increases with rupture speed, steady ruptures have a well-defined speed and are stable. {W}hen {G}(c) not equal {G}(0), the rupture acquires an inertial effect: the rupture-tip-equation-of-motion depends explicitly on rupture acceleration. {T}his inertial effect does not exist in the classical theory of dynamic rupture in 2-{D} unbounded media and in unbounded faults in 3{D}, but emerges in 2-{D} bounded media or, as shown here, as a consequence of the finite rupture width in 3{D}. {T}hese findings highlight the essential role of the seismogenic width on rupture dynamics. {B}ased on the rupture-tip-equation-of-motion we define the rupture potential, a function that determines the size of next earthquake, and we propose a conceptual model that helps rationalize one type of "supercycles" observed on segmented faults. {M}ore generally, the theory developed here can yield relations between earthquake source properties (final magnitude, moment rate function, radiated energy) and the heterogeneities of stress and strength along the fault, which can then be used to extract statistical information on fault heterogeneity from source time functions of past earthquakes or as physics-based constraints on finite-fault source inversion and on seismic hazard assessment.},
  keywords = {},
  booktitle = {},
  journal = {{J}ournal of {G}eophysical {R}esearch : {S}olid {E}arth},
  volume = {124},
  numero = {8},
  pages = {8584--8610},
  ISSN = {2169-9313},
  year = {2019},
  DOI = {10.1029/2019jb017684},
  URL = {https://www.documentation.ird.fr/hor/fdi:010077128},
}