~fluidity-core/fluidity/darcy_weak_bcs

        <DataArray type="Float64" Name="Phase1::Pressure" format="appended" RangeMin="0"                    RangeMax="4369489.5824"         offset="0"                   />

        <DataArray type="Float64" Name="Phase1::Saturation" format="appended" RangeMin="0.11750470196"        RangeMax="0.90000001637"        offset="1028"                />

        <DataArray type="Float64" Name="Phase1::RelativePermeability" format="appended" RangeMin="0.00030641459072"     RangeMax="0.64000002619"        offset="1936"                />

        <DataArray type="Float64" Name="Phase1::Density" format="appended" RangeMin="1"                    RangeMax="1"                    offset="2844"                />

        <DataArray type="Float64" Name="Phase1::DarcyVelocityOverPorosityCFL" format="appended" RangeMin="2.1317588583e-06"     RangeMax="0.0022339571683"      offset="2896"                />

        <DataArray type="Float64" Name="Phase1::DivergenceTotalDarcyVelocity" format="appended" RangeMin="-1.3555985408"        RangeMax="3.6825931901"         offset="3992"                />

        <DataArray type="Float64" Name="Phase1::Mobility" format="appended" RangeMin="3.0648922687"         RangeMax="6400.0000247"         offset="4968"                />

        <DataArray type="Float64" Name="Phase1::TotalMobility" format="appended" RangeMin="3428.6787246"         RangeMax="6400.0000247"         offset="5968"                />

        <DataArray type="Float64" Name="Phase1::FractionalFlow" format="appended" RangeMin="0.00050030722167"     RangeMax="1"                    offset="6952"                />

        <DataArray type="Float64" Name="Phase1::SumSaturation" format="appended" RangeMin="1"                    RangeMax="1"                    offset="7892"                />

        <DataArray type="Float64" Name="Phase1::AveragePressure" format="appended" RangeMin="0"                    RangeMax="4369489.5824"         offset="7944"                />

        <DataArray type="Float64" Name="Phase1::RegressionSaturation" format="appended" RangeMin="0.11750557866"        RangeMax="0.90000004071"        offset="8972"                />

        <DataArray type="Float64" Name="Phase1::RegressionSaturationError" format="appended" RangeMin="0"                    RangeMax="0.021904248837"       offset="9884"                />

        <DataArray type="Float64" Name="Phase1::RegressionPressure" format="appended" RangeMin="0"                    RangeMax="4367917.5575"         offset="10740"               />

        <DataArray type="Float64" Name="Phase1::RegressionPressureError" format="appended" RangeMin="0"                    RangeMax="13670.56074"          offset="11764"               />

        <DataArray type="Float64" Name="Phase1::Time" format="appended" RangeMin="0.2"                  RangeMax="0.2"                  offset="12736"               />

        <DataArray type="Float64" Name="Phase2::Pressure" format="appended" RangeMin="0"                    RangeMax="4369489.5824"         offset="12792"               />

        <DataArray type="Float64" Name="Phase2::Saturation" format="appended" RangeMin="0.099999983631"       RangeMax="0.88249529804"        offset="13820"               />

        <DataArray type="Float64" Name="Phase2::RelativePermeability" format="appended" RangeMin="0"                    RangeMax="0.61229889145"        offset="14740"               />

        <DataArray type="Float64" Name="Phase2::Density" format="appended" RangeMin="2"                    RangeMax="2"                    offset="15704"               />

        <DataArray type="Float64" Name="Phase2::DarcyVelocityOverPorosityCFL" format="appended" RangeMin="0"                    RangeMax="0.0022188875238"      offset="15756"               />

        <DataArray type="Float64" Name="Phase2::Mobility" format="appended" RangeMin="1.525748534e-31"      RangeMax="6122.9555528"         offset="16844"               />

        <DataArray type="Float64" Name="Phase2::FractionalFlow" format="appended" RangeMin="2.3839820844e-35"     RangeMax="0.99949969278"        offset="17940"               />

        <DataArray type="Float64" Name="Phase2::LinearInterpolatedAnalyticalSaturationSolution" format="appended" RangeMin="0.1"                  RangeMax="0.9"                  offset="19036"               />

        <DataArray type="Float64" Name="Phase2::AnalyticSaturationError" format="appended" RangeMin="0"                    RangeMax="0.54955156158"        offset="19196"               />

        <DataArray type="Float64" Name="Phase1::DarcyVelocity" NumberOfComponents="3" format="appended" RangeMin="0.00095915533041"     RangeMax="1.1963685133"         offset="20124"               />

        <DataArray type="Float64" Name="Phase1::TotalDarcyVelocity" NumberOfComponents="3" format="appended" RangeMin="0.84654220443"        RangeMax="1.2475742348"         offset="23232"               />

        <DataArray type="Float64" Name="Phase1::BulkDarcyVelocity" NumberOfComponents="3" format="appended" RangeMin="0.47425171278"        RangeMax="1.0720040475"         offset="26324"               />

        <DataArray type="Float64" Name="Phase2::DarcyVelocity" NumberOfComponents="3" format="appended" RangeMin="1.4196370264e-36"     RangeMax="0.99780543586"        offset="29428"               />

        <DataArray type="Float64" Name="Phase1::Viscosity" format="appended" RangeMin="0.0001"               RangeMax="0.0001"               offset="32560"               />

        <DataArray type="Float64" Name="Phase1::Porosity" format="appended" RangeMin="0.5"                  RangeMax="0.5"                  offset="32628"               />

        <DataArray type="Float64" Name="Phase1::AbsolutePermeability" format="appended" RangeMin="1e-10"                RangeMax="1e-10"                offset="32692"               />

        <DataArray type="Float64" Name="Phase2::Viscosity" format="appended" RangeMin="0.0001"               RangeMax="0.0001"               offset="32760"               />

        <DataArray type="Float64" Name="Phase1::GravityDirection" NumberOfComponents="3" format="appended" RangeMin="1"                    RangeMax="1"                    offset="32828"               />

        <DataArray type="Float64" Name="Points" NumberOfComponents="3" format="appended" RangeMin="0"                    RangeMax="1.7320508076"         offset="32912"               />

        <DataArray type="Int64" Name="connectivity" format="appended" RangeMin=""                     RangeMax=""                     offset="33352"               />

        <DataArray type="Int64" Name="offsets" format="appended" RangeMin=""                     RangeMax=""                     offset="34804"               />

        <DataArray type="UInt8" Name="types" format="appended" RangeMin=""                     RangeMax=""                     offset="35332"               />

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AQAAAACAAAAYAwAAFQAAAA==eJxjYACBD/YMo/QoPUrDaQBMiXUuAQAAAACAAAAYAwAA7wIAAA==eJxlkG0slAEAx48ixrnuJTnLhGppj5iXSneX/R/umbs87ZS1WTPXlTEj2521ShmVikW5Wp0OQ7qrCOVl56WUZDGrmyMvldduNlkUckovXyof+n37ffnvv9+rwZiapCsyMP4QGUfF8SpW3KXx00ZZ7or/hRkVH3Hujgxykas5I4tG96qQ1OVOCdKXnX7sXRJj881sQymPRHeoyf74FiFaLtcrFexATJ0/rfAY9kFaTHWXQ48XDpZwvwW1cTFr2uPF6KTx5dAYdcRNivzFx8Z1sRT49UmH4/NJzDxkPdEkijBAkpF9Z4OQ8DNcX/CIgM7Q3jzm4IX25ymNZgYXF3+ZNLsLVv5Gz/VbH8igcVKV1hbRIUFXVOHE+89ifFTarVdak5hf3mz+OCFAqi6kaBcVgOtv5cE/WQTC1vf6Pmv2xA4n6VN5K+ffnlXpIW60OxuV2kH20emN6K2YznChveE6lnsiyy0IgoXXfk1bRfA+5j4nTidhcctWWKIonPKL9e3gS3EhP7phqI3GuI+0mlMkw4f2/VWMnP/7ziasbRoqkyEyS2QzqaER+9J/8uSwBFp5VsIJewqrW0Jrm/kkeNqU1jpHIZQvEqfCpAHIvs8xKrQEZqgBF1u2FyrP0+FjTlzkOWoEjUoaPY55F/X1Emwfyklpfy/GXefqw8Yp4KuLKtNdL4BqJNw7acQfsvradXYEgfIHgqrKV56oNanCc0wrHR4tbrPVG2how3xfGhyk8CsutCmnKZS/s1S1nCGRq1bz7+4W4bauMLl4XxCEiUWDIdHbkL/pHpN3wwNXo6x05hI2zgbPdyaoZcger+H6lNHwaehk5cxLwGcmh3j4U0gsqXqojCFxxsqZ7f1ZiLz+owbjQiAO8vwzA9IIMOXpqbemPPHBMrphfJSDgYbvjGNqGl8t99fM9UsQ5qpa6rOmcMlWXNfAIUHY7CxUrBaioHTmCys1AP0cHjnMJnCj23jtTZ0niEybe3Z1HPwGf284yg==AQAAAACAAAAYAwAAmAIAAA==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AQAAAACAAAAYAwAAcAIAAA==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AQAAAACAAAAYAwAAxQIAAA==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AQAAAACAAAAYAwAAFgAAAA==eJxbNBMETtovGqVH6VEaTgMA4T3MpQ==AQAAAACAAAAYAwAA7wIAAA==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AQAAAACAAAAYAwAAngIAAA==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AQAAAACAAAAYAwAAvwIAAA==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AQAAAACAAAAYAwAAFAAAAA==eJxjYAADB4ZRepQepeE0AAQSGME=AQAAAACAAAAYAwAAHgMAAA==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AQAAAACAAAAYAwAAIwMAAA==eJwBGAPn/IF9lHOO7O8/////////+DhUlQboOvfvP1I4sbZUsfc4OyaJYwnt7z+ORaN8GMHfOD+MN0pFsL84DAqbx+b77z/M+GJ18LXvP+OyKupuS+8/aLf6K33F7j8o9133UdftP3pjMRkxUeY/omxtMMhvpj+A0EyJbh/tPl7dY2DsddA8EjmFG5+yEzk4q61jJtrvPyztRvxilu8/Tymi19Uy7z/EeGo+qqHuP8Czpq7ueu0/DE1RhZCc4z/tTFkd/RKdP+ky182bGb0+uYHIX1moWzoAXmNgse7vP/7///////g4L/mycKLE7z+JMdZG+HHvPyFXJ64PAe8/RqnolaNj7j+qEfpPt97sP07/xEl92s8/KsA+mfQicT/fY92qbGECPhzGs9SyJuI5vGmmMTMh9zhKqSpsPazROcUIV+5JaQI/oI+ylIkUwj/kL8tnulLrPzLXIgSnDO4/BtxlfDva7j/dI1iRQ1jvP0kBzn0zr+8/hm+IysXj7z85nwGgxe/vP+zN5Wrx5+8/H1nyfpqO5zgWpeOS1tHIOCUL7Ts0+O8/nZ0TXITC7z8qFzveKG/vP5uFwlSr+O4/eENZY/tH7j8HvSNUjgrsPxgOkMc90cM/OLV3/ZPoUT86btmnxLbHPTXna2/O+BU6hyMUkX6v7z88fGice13vPzMW6ypx4e4/LjWApfMZ7j/KmR3ORhvrP94W0ADeV8A/7OsNpJGVQD+aq1WWe82FPc7kB0RN/YM55sPNucAm+Dj2xA8ald3vP1Lm8yIjnu8/EeC0h51H7z/7rQAO+cbuP2DgoOGf2u0/fwymfmMq6T+s8vmjj2u2PwRG88qE3/0+meALfH9oSDoJ+EWod/XvP9eIAg4TzO8/P+m7vFuQ7z9e8oqr6ynvPx5BYRRamO4/+2WhUACC7T8O88cn0wLiPwqwdj3EY5k/+xQByB/9qT6TPBG4KdRIOoxTuN+o0u8/Al9P4QGE7z8hr+Ra/xbvP75WtncVeO4/+SY6xigJ7T9VNgJPaaTWP7C/cdydEIA/VE/zwRxALj4d6DR0PrZcOkhGmIM=AQAAAACAAAAYAwAAZgAAAA==eJw7ewYE3tjPmgkCO+3PEuCji79SfLB8/dTX9idSOt7MaH5lz/iv7dKE7pf2vn2TLzUtfWG/Kv0q08tTzzH0o9PUMgfdvdQyl1gaZh7MfJh9MPth7oG5c6iFL63ia7D5EwDibtj8AQAAAACAAAAYAwAApQIAAA==eJwriGU5fslosT0DGBTYMOg8zb/GMgvOVziUd6r+7yIoHwESUk6sPPBmon2CyM23GeyL7Tc8jlpqsxRojoqfvJ4YUH3mPW5TyeX2C84uSGO+edxeQDV1xrE5jUBzEprybhbbQUyZYAO3R/r90nL5qfYLWHc9dyqYaM/Qf/axsVWfvYLR6mdFJhPsC5TDPF3lF9rnhTyVa71+w/6A0TU1zf4MkLsmfLn8wxbufrn1FYyei+DuP3D8XnvQ6/n2CmLbI1MCZts7aN/6ExQ8w/5AuMMuOdnp9hcYZEo2Ki2z91abrSNZcdye4cOtEPcOPoj+NfoIczHp9fq8BnZfbPd8D2Hdav/5Ap/G26kP7RvW71gzY02nfcMOCYmJZaXAcFjo9EylxJ5hv+e0DT/r7A+cCT69vrHP/kJ02AXH1wvtC8Qepi70W4oRvgd+/bnmdXmG/Qemms5PKgvsFV4e773GOsc+IZhJZeWumfYOPSskVjLPtn/xOmOGtvoGe44rl5acSNpmz9CgoKu6/j0kfGOk4e4X2FueqrNqif2Hok8q1gsX2jOcPGJgJ7PAnqFl16Ni4cX2HzTm6Rydt92+waxM1tdwDdA9/ZVvUs5CzDlwEcP/C6xiNUtuT7J3OFJ6Lf9RD1DfhXi/LS32DtOvvZxk3mx/gO9XQOnZKfZT9CI7Kx7et3/BeVt65oypQHMdUmsnB9rBzHnwoE91W+gceweLuWr9HkD/HV5zb0bFZPsDzi85uq5PtH+QpHvxjS0wnb3iOLN6zlz7bf8nzLsbcN2+4cyJrhd18aBwS2CveAj354KME0vW/Z4JDHf7CVwa0+0XrPjIrnxyir2C8pb3CxOm2idULPEw9F5qLyhqJP7o0ml7hmNd7xl5lcDhf8AlAm4OAHftIto=AQAAAACAAABICQAACAkAAA==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AQAAAACAAABICQAA+wgAAA==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AQAAAACAAABICQAABAkAAA==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AQAAAACAAABICQAAGgkAAA==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AQAAAACAAACABwAAHwAAAA==eJzTdZZ5/chMyl53lB6lR+lRepQepUdputEAoke5nw==AQAAAACAAACABwAAHQAAAA==eJxjYACBB/YMo/QoPUqP0qP0KD1K040GAOlCDSA=AQAAAACAAACABwAAIAAAAA==eJzbvff6zfs1t213j9Kj9Cg9So/So/QoTTcaAJBWQZw=AQAAAACAAACABwAAHwAAAA==eJzTdZZ5/chMyl53lB6lR+lRepQepUdputEAoke5nw==AQAAAACAAACAFgAALQAAAA==eJztyCERAAAIBLDvX4pKRODwKPQml6yunLz33nvvvffee++999773w+atZQgAQAAAACAAABICQAANgEAAA==eJyNlMEJwzAUQ7NTB/A23andpCME2lNPuX0IFAI9eISSFGP++19JfClVfmTLkjIMe6uW3cfheft/9r2j94/n7rd1PcJ+f3wM+GVbbzE/iXOb4JkDft3WR/AvAX891/UV84+g3+vquNfF+UncowmeOeBeF/mXgHtdKg+81zZn4Ke/zXf6W0vub5unv3E/z0N/a8n9bfz0t5bcX+a6+5DfG/k7nvvC8+v9PD9zwvvkPHPIPqr+xtydex7P7fG2Ou7Pw1yNAfd6OT+J/UzwzAH3fpF/CbjPw1EvTPTCRC9M9CLq8TzshYlemOiFiV7QXxM+0l/mkHo5z5xTL3nYI+olP3tKvSq3Sm8/V55b9pTzzK3WneeW3xnyM7f8jnGeuuhjx3Nd9JE64m+uiz6Sn7roY8d/xYbTIw==AQAAAACAAAAAHgAALwQAAA==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eJzj4hpZAABq3Alh